Kac's Walk on n-sphere mixes in n n steps

Abstract

Determining the mixing time of Kac's random walk on the sphere Sn-1 is a long-standing open problem. We show that the total variation mixing time of Kac's walk on Sn-1 is between 12 \, n (n) and 200 \,n (n). Our bound is thus optimal up to a constant factor, improving on the best-known upper bound of O(n5 (n)2) due to Jiang. Our main tool is a `non-Markovian' coupling recently introduced by the second author for obtaining the convergence rates of certain high dimensional Gibbs samplers in continuous state spaces.